a 98% peak efficiency 1.5a 12v-to-1.5v switched capacitor dc-dc converter in 0.18um cmos ...
TRANSCRIPT
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A 98% peak efficiency 1.5A 12V-to-1.5V SwitchedCapacitor dc-dc converter in 0.18um CMOS
technology
Vincent Wai-Shan NgSeth R. Sanders
Electrical Engineering and Computer SciencesUniversity of California at Berkeley
Technical Report No. UCB/EECS-2008-5
http://www.eecs.berkeley.edu/Pubs/TechRpts/2008/EECS-2008-5.html
January 13, 2008
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Copyright 2008, by the author(s).All rights reserved.
Permission to make digital or hard copies of all or part of this work forpersonal or classroom use is granted without fee provided that copies arenot made or distributed for profit or commercial advantage and that copiesbear this notice and the full citation on the first page. To copy otherwise, torepublish, to post on servers or to redistribute to lists, requires prior specificpermission.
Acknowledgement
I would like to thank National Semiconductor Inc for donating the processand financially supporting this project. I would also like to thank Professor
Seth R Sanders, Michael D Seeman and Jian-Hui Zhang for advices andsupports in this project.
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A 98% peak efficiency 1.5A 12V-to-1.5V Switched Capacitor
dc-dc converter in 0.18m CMOS technology
by Vincent W Ng
Masters Research Project
Submitted to the Department of Electrical Engineering and Computer Sciences,
University of California at Berkeley, in partial satisfaction of the requirements for the
degree ofMaster of Science, Plan II.
Approval for the Report and Comprehensive Examination:
Committee:
Professor Seth Sanders
Research Advisor
(Date)
* * * * * * *
Professor Elad Alon
Second Reader
(Date)
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Copyright 2006, by the author(s).All rights reserved.
Permission to make digital or hard copies of all or part of this work forpersonal or classroom use is granted without fee provided that copies are notmade or distributed for profit or commercial advantage and that copies bear thisnotice and the full citation on the first page. To copy otherwise, to republish, topost on servers or to redistribute to lists, requires prior specific permission.
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Table of Content
Abstract p.1
1. Introduction and Motivation p.2
2. Background Theories and Previous Work p.4
2.1 Analysis and optimization procedure for SC dc-dc converters p.4
2.1.1 Performance analysis of SC dc-dc converters p.4
2.1.1.1 Slow Switching Limit output referred resistance p.5
2.1.1.2 Fast Switching Limit output referred resistance p.7
2.1.2 Optimization of SC dc-dc converters p.9
2.1.2.1 Power-train capacitor optimization p.10
2.1.2.2 Power Switch optimization p.11
2.2 Analysis of triple-well devices p.13
2.2.1 Latch-up concerns p.13
2.2.2 Voltage stress concerns p.15
3. Architecture p.17
3.1 Overall Architecture p.17
3.2 Device choice and biasing p.19
3.3 Topology choices p.20
3.4 Transistor and Capacitor sizing p.23
3.4.1 Capacitor optimization p.24
3.4.2 Switch optimization p.25
4. Circuit Design p.28
4.1 Driver block circuit p.28
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4.2 Clock generation circuit p.28
4.3 Helper rail implementation p.29
5. Layout p.32
6. Experimental Results p.34
7. Discussion p.37
8. Conclusion p.38
Acknowledgement p.39
References p.40
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List of figures and tables
Table I: Sizes of power-train capacitors and power switches p.27
Table II: Area of different components in die layout p.33
Figure 1: Conduction Loss Comparison p.3
Figure 2: Ladder Type SC dc-dc converter p.6
Figure 3: Capacitor charge flows p.6
Figure 4: Switch charge flows p.8
Figure 5: Output impedance versus switching frequency p.9
Figure 6: Thyristor Structure p.13
Figure 7: Net dopant concentration of a typical triple-well NMOS p.16
Figure 8: Voltage potential profile of a triple-well NMOS p.16
Figure 9: Overall circuit of the 12V-to-1.5V step down Dickson converter p.18
Figure 10: Five common switched-capacitor converter topologies p.21
Figure 11: Equivalent circuits of Dickson converter for different capacitor voltages p.23
Figure 12: Details of the driver block in figure 9 p.29
Figure 13: Details of the clock generator p.30
Figure 14: Implementation ofC10 helper rail p.31
Figure 15: The die photo of the layout of the fabricated circuit p.33
Figure 16: The experimental output waveform p.35
Figure 17: The measured and theoretical output referred resistance p.36
Figure 18: The theoretical and experimental efficiency versus load current p.36
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Abstract
This thesis presents a 12V-to-1.5V Switched-Capacitor dc-dc converter. The overall
circuit is a Dickson-type 8-to-1 step down converter in a 0.18m CMOS technology. The
power transistors are implemented with native 0.18m 1.8V NMOS and 0.5m 5V
NMOS, whereas the power-train capacitors are implemented with off-chip ceramic
capacitors. The die is divided into various voltage domains isolated with triple-well nwell
structures to ensure that no terminal of any transistor has overstress voltage levels, even
though, each terminal itself may be as high as 15V above the substrate voltage level. This
circuit shows a peak efficiency of 98% at 50mA load and a maximum load of about 1.5A.
Significantly, the efficiency remains at 90% or higher for the load range from 6 mA to
400 mA without need for any mode or switching frequency adjustments. The efficiency
at low load condition can be further increased by reducing the switching frequency of the
circuit. The active die area is 3 mm2
out of a total area of 9mm2. All power switches are
located at the periphery of the die to minimize on-chip metal resistances, leaving the
middle portion of the die empty. The experimental efficiency data matches very well with
the theoretical curve. If solder bump pads are used to eliminate bondwires and other
interconnect pathways to the printed circuit board, the output referred resistance can be
potentially reduced by 50% while reducing the die area by 66%.
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1. Introduction and Motivation
This work explores the design and development of CMOS-based switched-capacitor (SC)
dc-dc conversion circuitry aimed at applications traditionally addressed with the
ubiquitous buck converter. The traditional buck converter requires at least one substantial
inductor and transistors with voltage rating matched to the input source voltage, which
may be costly to integrate in a submicron CMOS technology. The traditional buck
converter also suffers from low efficiency or poor power device utilization when used in
a high-conversion-ratio application. Figure 1 [1, 2] shows the relative conduction loss of
an SC converter when compared to a boost converter and transformer-bridge converter
for a given G-V2product for power switches, where G is the conductance and V is the
blocking voltage of power switches. The G-V2
product roughly corresponds to silicon
area for MOSFET transistors and thus represents device cost in this analysis. Besides
suffering from low efficiency in a high-conversion-ratio application, the buck converter
efficiency also degrades rapidly in low-power modes unless additional special modes
(like PFM) are enabled. Switched-capacitor dc-dc converters, on the other hand, can
sustain high efficiency with a high conversion ratio, and also over a very wide load range.
Moreover, SC dc-dc converters do not require any magnetics or high voltage transistors.
As discussed in this thesis, each power transistor needs to only block a fraction of the
input voltage, thus allowing a high voltage dc-dc converter to be built in a submicron
technology with native transistors.
This thesis first summarizes the background theory and work in designing an SC dc-dc
converter in submicron CMOS technology. This includes the mathematical calculations
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and optimization procedures of designing an SC dc-dc converter [1, 2], and an analysis of
the latch-up issues and voltage stress concerns of triple well devices. Afterwards, the
thesis will focus on the design issue of the switched capacitor dc-dc converter and the test
results of the first prototype. This prototype is a 12V-to-1.5V SC dc-dc converter in a
0.18m CMOS technology with a peak output current of 1.5A and a peak efficiency of
98%. The result not only shows that 12V conversion is indeed possible in a submicron
technology, but that this converter has very attractive performance and efficiency over a
wide load range, in spite of the high conversion ratio. This converter is ideal for the
point-of-load application in which a dc-dc converter is placed close to an associated load.
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2 Background Theories and Previous Work
2.1 Analysis and optimization procedures for SC dc-dc converters
2.1.1 Performance analysis of SC dc-dc converters
The losses in SC dc-dc converters can be separated into load dependent losses and load
independent losses. Load independent losses refer to the power consumed by the
converter at zero load condition. In the case of an SC dc-dc converter, this loss mostly
arises from charging and discharging parasitic capacitances, for example, the gates of
power switches. These losses can be easily calculated by using conventional circuit
analysis. For example power switch gate losses can be calculated by CV2f, where Cis the
value of the parasitic capacitor, V is the voltage swing of the capacitor and f is the
switching frequency of the converter. Load dependent losses, on the other hand, are less
intuitive to calculate. They are modeled by an output referred resistance, and will be the
focus of this section.
Makowski and Maksimovic [6] use the fundamental loop matrices and the fundamental
cut-set matrices to derive an SC dc-dc converters output impedance. The analysis is
fundamental but requires a fair amount of calculations. Seeman and Sanders [1, 2]
derives a simpler methodology based on Tellegens theory [7] and Kirchhoffs law. This
methodology is easier to use and is summarized below.
Seeman and Sanders [1, 2] divide the load dependent losses into slow switching limit
regime and fast switching limit regime. The slow switching limit corresponds to
operation at sufficiently low frequency that capacitor voltages fully equalize after each
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switch event. Losses in this regime are due to voltage swings in the power-train
capacitors during each cycle. The losses are only dependent on the sizes of the power-
train capacitors and the switching frequency. On the other hand, the fast switching limit is
characterized by nearly constant current flows between power-train capacitors. The
switch on-state resistance and other parasitic resistances are sufficiently large such that
during each phase, the capacitors do not approach equilibrium. In this asymptotic limit,
the currents between power-train capacitors are constant and capacitor voltages are
modeled as constant. Losses in the fast switching limit are due to conduction losses in the
resistances within the converters. These resistances include the power switch triode
region resistance and parasitic resistances. The losses in these two regimes are dependent
on two separate lists of parameters, and thus allow the designer to consider the operation
in these two regimes separately. The total output referred resistance can be approximated
[1, 2] as:
22
FSLSSLOUT RRR += (1)
whereRSSL andRFSL are the slow switching limit asymptotic resistance and fast switching
limit asymptotic resistance respectively. The method to calculate these terms will be
discussed in the following sections.
2.1.1.1 Slow Switching Limit output referred resistance:
In the slow switching limit, the output referred resistance is given by:
=i swi
ic
SSLfC
aR
2
, )((2)
where fsw is the switching frequency, Ci is the capacitance of capacitor i and ac,i is the
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charge multiplier coefficient of capacitor i. Coefficient ac,i can be considered simply as
igure 2 [2] shows a step down Ladder-type SC converter and Figure 3 [2] shows the
the ratio between the charge flow in Ci and the output charge flow in steady state. The
way to obtain this number is illustrated with an example below [1, 2].
F
charge flow in the two clock phases during steady state. First the charge supplied by VIN
is denoted as qin. Since VIN is only connected to the converter in phase 2, the charge flow
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to C4 in phase 2 ( 2,4cq ) is qin. By conservation of charge, C4 has to supply an equal
amount of charge in phase 1, that is qq = . Thus the charge flowing into C2,41,4 cc 3 ( q )
during phase 1 is equal to q
1,3c
in. Using Kirchhoffs Current Law (KCL) on node D in phase
2, the charge flowing into C2 ( 2,2cq ) is equal to 2qin. Similarly, the amount of charges
flowing into and out of each capacitor and terminals in each phase can be determined.
Using this analysis, one can show that the total amount of charge flowing into the output
terminal is 3qin. The charge multiplier coefficient ac,i can then be determined by dividing
the charge flow of each capacitor by the charge delivered to the output terminal.
out
cici qq 2,1,
out
icqq
a , == (3)
For example, forC2,
3
2
3
22,22, ===
in
in
out
c
cq
q
q
qa (4)
Similarly, the charge multiplier coefficients can be obtained for all the power-train
.1.1.2 Fast Switching Limit output referred resistance:
ce is given by:
capacitors.
2
In the fast switching limit (FSL), the output referred resistan
= iriFSL aRR 2, )(2 i
(5)
whereRi is the on-state resistance of resistori. This resistor can be the on-state resistance
of a switch or any parasitic resistances. Parameterar,i is the charge multiplier coefficient
of resistori and has a similar definition to that ofac,i ; it can be considered simply as the
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After determining the targetRNOMandfmax ,RSSL andRFSL are chosen to be
2/NOMFSLSSL RRR == (7)
at fmax . Since RSSL and RFSL depend on two separate set of parameters, the designer can
then optimize the power-train capacitors and power switches separately.
2.1.2.1 Power-train Capacitor Optimization
The power-train capacitors only affect RSSL but not RFSL, and thus power-train capacitor
sizes can be optimized using the slow switching limit equations alone. In this
optimization process, the power-train capacitors are sized such that the total energy
storage capability is minimized while the required RSSL is satisfied at the chosen fmax.
Seeman and Sanders [1, 2] chose to minimize energy storage capability since it is roughly
proportional to physical size and device cost of capacitors. The RSSL equation given by
equation (2) can be rewritten as:
2
)(,,2
1
= ratedicic
swtot
SSL vafE
R (8)
wherefsw is the switching frequency,Etot is the total energy storage capacity of all power
train capacitors, ac,i is the charge multiplier coefficient of capacitor i, and vc,i(rated) is the
rated voltage of capacitor i. Note that vc,i(rated) is defined to be the rated voltage of
capacitor i but not the working voltage of capacitor i. The working voltage of a power-
train capacitor is the maximum voltage on the capacitor during steady-state operation.
Ideally, capacitors are chosen such that the rated voltage matches the working voltage.
However, when a match is impossible, the rated voltage has to be greater than the
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working voltage, and the rated voltage will be used in the calculations. Parameterfsw in
this calculation is the fmax chosen for the design, and ac,i can be determined using the
method outlined in section 2.1.1.1.
The optimization procedure begins with using equation (8) to solve forEtot with the
chosenRSSL andfsw. Afterwards, the optimized capacitance for each power train capacitor
i can be obtained by:
=
k
ratedkckc
tot
ratedic
ic
iva
E
v
aC
)(,,)(,
, 2(9)
2.1.2.2 Power Switch Optimization
Power switches in SC dc-dc converters only affectRFSL but notRSSL, and thus they can be
optimized independently from the power-train capacitors. The optimization procedure [1,
2] minimizes the V-A product, or equivalently G-V2
product, over all switches while
attaining the chosen RFSL value. The V-A product stands for the product of the rated
voltage and current flow of MOSFET transistors; it roughly corresponds to silicon area
and thus represents device cost. Ignoring all parasitic resistances in the converter, the
RFSL equation given by equation (5) can be written as:
2
)(,,
2
=
i
ratedirir
tot
FSL vaA
R (10)
where Atot is a parameter roughly proportional to the total silicon area usage, ar,i is the
charge multiplier coefficient of switch i, and vr,i(rated) is the rated voltage of the switches.
Parameter vr,i(rated) is defined to be the voltages in which these power transistors are
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designed to operate at. Ideally, the rated voltage of transistors are equal to the maximum
voltages these transistors block in steady state; but if they are different due to process
availability, the designer should choose transistors with a rated voltage larger than the
voltage the transistors are expected to block in steady state. The optimization procedure
uses the rated voltage of the transistors instead of its blocking voltage because rated
voltage better represents the device cost. Parameterar,i can be obtained in the same way
as illustrated in section 2.1.1.2.
The optimization procedure begins with using equation (10) to obtain Atot for the chosen
RFSL. The optimal conductance Gi of each power transistor can be obtained by:
=
k
ratedkrkr
tot
ratedir
ir
iva
A
v
aG
)(,,)(,
,(11)
The above optimization procedure ignores parasitic resistances in the converter. Parasitic
resistances can be incorporated into the model by first evaluating their contribution to
RFSL using equation (5). The result (RFSL(parasitic)) can then be subtracted from the RFSL
obtained from equation (7). This remaining portion ofRFSL (RFSL(switch)) is the quota of
RFSL left for power switches. This RFSL(switch), together with equations (10) and (11), can
be used to calculate the optimal conductance of each power switch.
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2.2 Analysis of Triple well devices
One of the main advantages of using SC converters over the buck converter is that each
power switch in a SC converter needs to only block a fraction of the input voltage, thus
allowing a high voltage dc-dc converter to be built in a submicron technology with native
transistors. Triple well structures allow isolation of transistors into different voltage
domains, so that no terminal of any transistor (except the n-well to p-subtrate junction)
has overstress voltage levels, even though, each terminal is at a very high voltage relative
to the substrate. The circuit described in this thesis has 5V transistors biased up to 15V,
but the only junction that needs to sustain voltages higher than 3V is the n-well to p-
substrate pn junction. This section investigates latch-up and voltage stress concerns with
biasing triple well structures in this manner.
2.2.1 Latch-up Concerns
Figure 6 shows the thyristor structure that leads to latch-up in single n-well CMOS
process. The structure is a parasitic npnp structure in which the first np pair is connected
to one voltage level whereas the second np pair is connected to another voltage level. In a
conventional CMOS connection, this structure exists with the 4 layers corresponding to
source of NMOS (n) substrate (p) well of PMOS (n) source of PMOS (p), and the
two voltage levels corresponding to ground and power supply. This structure forms a
positive feedback loop of gain greater than 1 if
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121 > RR pnpnpn (12)
where npn and pnp are the current gain of the parasitic npn and pnp bipolar transistors
respectively. If equation (12) is satisfied, the thyristor will turn on, causing huge current
to flow from the power supply to ground. This is called latch-up. When latch-up occurs,
the only way to stop it is to disconnect the power supply. Designers are advised to reduce
the magnitude of the four terms in equation (12) such that equation (12) is never satisfied.
Triple well devices have an extra n-layer making the structure more complicated. Muth [3]
considered all paths in a triple-well device, and concluded that the thyristor structure
shown in figure 6 does not exist. Without the thyristor structure, triple-well devices
cannot latch-up. Intuitively, one can consider the n-well as an isolating layer separating
the NMOS from the PMOS, thus breaking the thyristor structure. However, if the
designer merges the triple-well n-well of the NMOS with the n-well of the PMOS, then a
thyristor structure will exist in a similar way as in a single well CMOS technology. This
does not necessarily lead to a higher latch-up probability when compared to a single well
CMOS technology, but the designer will no longer benefit from the latch-up robustness
of triple-well structures.
The circuit presented in this thesis involves biasing the n-well of the NMOS and the n-
well of the PMOS to a voltage much higher than the p-substrate. One can show that this
biasing scheme is very similar to the conventional triple-well biasing scheme, and no
thyristor structure exists. As a quick check, the p-substrate is not at the same voltage
potential as any adjacent n layers. Since both of the two p layers in the thyristor structure
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has an adjacent n layer at the same voltage potential, the p-substrate cannot be part of the
thyristor structure. Thus the p-substrate continues to isolate the NMOS from the PMOS in
this biasing scheme, making latch-up highly unlikely to occur.
2.2.2 Voltage Stress Concerns
The topology outlined in this thesis involves biasing low voltage transistors at high
voltages; as a result, some junctions have to be stressed more than their design values.
The gate oxide cannot be overstressed because this can easily lead to oxide breakdown.
Reverse biasing the NMOS source and body pn junction is undesirable since this reduces
transistor conductance due to body effect. The only junctions left are the NMOS p-body
to n-well junction and the n-well to p-substrate junction. Figure 7 shows the net dopant
profile of a typical triple-well NMOS device, whereas Figure 8 shows the voltage
potential of the device with n-well and drain biased to 1.5V whereas all other terminals
are biased at ground. One can see that the voltage potential of the portion of the p-body
between the n-well and drain is raised. This indicates that the depletion region
surrounding the drain has touched the depletion region surrounding the n-well; there is
punch-through from the drain to the n-well through the p-body. This shows that punch-
through may occur if the n-well to p-body junction is biased above its design value. On
the other hand, due to the low dopant concentration in the p-substrate, only a small
proportion of the depletion region occurs in the n-well; thus a punch-through in the n-
well is usually not a big concern. So it is generally safe to strongly reverse bias the n-well
to p-substrate pn junction; the n-well to p-body pn junction should be reverse bias, but it
should not exceed its design value.
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3. Architecture
3.1 Overall Architecture
Figure 9 shows the schematic of the 12V-to-1.5V Dickson converter [4]. In contrast to
the original design, the circuit of Figure 9 uses MOS switches in each position, and can
thus support bilateral current and power flow. Our initial interest is in its use as a step-
down converter. The switches are gated in a two-phase pattern, as indicated by number in
bracket next to the switch names in the figure. These two-phase clocks are non-
overlapping to avoid direct current consumption. The clock generator, together with all
control circuits, is powered by the output voltage of 1.5V. The clocks are level-shifted
upwards by the driver blocks shown in figure 9.
Besides the seven main power-train capacitors, C1-C7, there are three bypass capacitors,
C8-C10, shown in Figure 9. Capacitors C8(12V cap) and C9(13.5V cap) are needed to
provide gate-drive charge to the top NMOS power switches. CapacitorC10
(1.5V right-
hand-branch cap) is needed to provide 1.5V gate drive to power switch S4 on the bottom
right-hand side. All power-train capacitors and bypass capacitors are implemented with
off-chip ceramic capacitors. Power-train capacitors have to be implemented off-chip due
to their high value; bypass capacitors have smaller values but are nonetheless
implemented off-chip to save die area. NMOS transistors are used throughout the power-
train to minimize transistor area and gate charge. There may be strategic opportunities for
swapping in PMOS devices in a few locations, and in turn obviating the need for some of
the bypass capacitors, though this has not been done here.
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A switching frequency of 1 MHz is selected based upon practical capacitor choices.
Although the silicon can easily support a higher frequency, load-independent gating and
parasitic dynamic losses scale up with increasing frequency, while the effective discrete
capacitor impedance ceases to decrease in the range of 1-10 MHz due to the equivalent
series resistance (ESR) of standard ceramic capacitors. Thus, there is no substantial value
in operating at higher frequency unless the capacitors could be integrated on chip, or
radically reduced in physical size. However, the discrete parts selected here are already in
tiny 0603 packages, and by simple scaling from 1 MHz to 100 MHz, the multiple
capacitors in the range of 1 uF would scale to the range of 10 nF, still impractical for on-
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chip integration. Thus, 1 MHz provides an easy operating frequency at which gate
drive losses are relatively low, and are about 1 mW.
3.2 Device Choice and Biasing
The power switches in the Dickson converter block two different voltages. Referring to
Figure 9, the bottom 4 switches (S1-S4) only need to block a voltage of 1.5V whereas the
other switches (S5-S12) need to block 3V. S13 and S14 block 3V as well but they are not
part of the power-train. With the availability of 5V transistors in our 0.18m process, the
1.5V switches are implemented with native 0.18m 1.8V NMOS transistors and the 3V
switches are implemented with 0.6m 5V transistors. Cascoding two 1.8V switches to
block 3V was not implemented due to complexity of implementation, even though, using
5V transistors to block 3V is a slightly inefficient usage of these higher voltage
transistors. All power switches are implemented with NMOS devices for highest mobility,
with each p-body isolated in a triple-well nwell. Each power device has its p-body
shorted to its source to eliminate body effect.
Each power switch is driven by its respective driver block, as indicated by the dotted
arrows in Figure 9. Each driver block is referenced to the source of the power switch that
it drives. As such, each driver block is locally powered from two of the power-train
capacitors, as indicated in the figure. Isolation of NMOS devices is again achieved with
utilization of the triple-well structure as needed. This isolation ensures that no terminal of
any transistor within each voltage domain has overstress voltage level, even though each
terminal itself may be as high as 15V above the substrate voltage level. The triple-well
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nwells of the isolated NMOS in each voltage domain are tied together and connected to
the respective p-body with rare exceptions. The nwell is connected this way because
intermediate fixed voltage levels are not readily available. This connection scheme
reduces the p-body to deep Nwell voltage stress and also makes the layout simpler than
an arrangement in which the deep Nwell is biased at a higher fixed potential. The only
junctions that need to sustain voltages higher than 3V are the isolated NMOS deep Nwell
to p-substrate pn junctions and the PMOS nwell to p-substrate pn junctions. These
blocking voltage requirements are easily achieved with the low substrate dopant levels
and reasonable substrate thickness in most bulk CMOS technologies.
As previously discussed in section 2.2, one major concern of this biasing scheme is
latchup possibility. There are numerous pn junctions in this design and they are all biased
at different voltage levels. To make things worse, these voltage levels are time-varying
with respect to each other due to the switching activity of the converter. This will inject
carriers by capacitive coupling into the substrate and wells, which have low dopant levels
and high resistivity. Fortunately, this latchup concern is greatly mitigated by the mere
fact that triple well structures are extremely robust to latchup [3]. To further improve
latchup immunity, PMOS nwells are never merged with isolated NMOS nwells, and
substrate contact rings are placed to separate each voltage domain.
3.3 Topology Choices
Figure 10 [2] shows the five popular topologies compared and contrasted in [2]. Among
these five choices, the Dickson and Ladder circuits are best suited to CMOS integration
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since the switches in these circuits each block a fraction of the input source voltage.
Further, the required voltage ratings are uniform at one or two levels for these candidate
topologies. Additionally, the regular structure of these circuits facilitates a relatively
simple gate-drive level shifting scheme. Significantly, the Ladder and Dickson circuits
also make optimal use of the available silicon in terms of power output per total silicon
area, as discussed in [2]. The Dickson circuit has been selected over the Ladder circuit
since it requires roughly one-half the number of capacitors for a given application. In the
case of a multi-watt application, it is not feasible to realize the capacitors on-chip, and
thus, the pin and external component count is minimized with this choice.
The power-train capacitors in a Dickson topology can be implemented in two different
fashions as shown in figure 11. Both topologies give the same power switch constraints,
but one requires high voltage capacitors while the other only requires low voltage
capacitors. Since all power-train capacitors are implemented with discrete off-chip
ceramic capacitors, both topologies are practical. The optimization method outlined in
section 2.1.2 gives different capacitor values for these two topologies, but the resulting
capacitor energy storage capability is the same. Since the optimization method assumes
that capacitor cost is directly proportional to energy storage capability, these two
topologies should be equivalent to one another. However, ceramic capacitors have a
much higher energy density at high voltage ratings, thus the assumption no longer holds
and a high voltage capacitor version should be used.
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3.4.1 Capacitor Optimization
Using the methods outlined in section 2.1.1.1 and section 2.1.2.1, the capacitor charge
multiplier coefficient, ac,i, and the capacitor working voltage, vc,i(working), are respectively
given by:
[ ]
=
8
1
8
1
8
1
8
17,6,2,1, KK cccc aaaa (13)
[ ]5.1095.765.435.1)(7,)(1, =workingcworkingc vv K (14)
Setting fsw= 1MHz andRSSL = 150m / 2 = 106m, the optimized capacitor values are
given by:
[ ] [ FFFFFFFcc ]59.069.082.00.13.11.21.471 =K (15)
However, the optimization procedure outlined in section 2.1.2.1 uses capacitor rated
voltage, vc,i(rated), instead of capacitor working voltages. Using the rated voltages of
available ceramic capacitors, vc,i(rated) are given by:
[ ]1610103.63.644)(7,)(1, =ratedcratedc vv K (16)
and the optimized capacitor values are given by:
[ ] [ FFFFFFFcc ]52.083.083.03.13.11.21.271 =K (17)
Since discrete capacitors cannot be of arbitrary value, the actual capacitor sizes used in
this design are given by:
[ ] [ FFFFFFFcc ]47.068.068.0112.22.271 =K (18)
This result is summarized in Table I. The first column of Table I shows the ideal
capacitor values given by equation (15), whereas the second column of Table I shows the
actual capacitor values used given by equation (18). Table I also shows the value of the
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helper capacitors, C8 - C10, used in this design. Capacitor values forC8 - C10 are chosen
arbitrarily based on the smallest available ceramic capacitor sizes.
3.4.2 Switch Optimization
Using the methods outlined in section 2.1.1.2 and section 2.1.2.2, the switch charge
multiplier coefficient, ar,i, and the switch blocking voltage, vr,i(blocking), are respectively
given by:
[ ]
=
8
1
8
1
2
1
2
112,5,4,1, KKKK rrrr aaaa (19)
[ ]335.15.1)(12,)(5,)(4,)(1, LLKK =blockingrblockingrblockingrblockingr vvvv (20)
However, the optimization procedure outlined in section 2.1.2.2 uses switch rated
voltages, vr,i(rated), instead of switch blocking voltages. Since only 0.18m 1.8V transistor
and 0.6m 5V transistor are available in this technology, the switch rated voltages,
vr,i(rated), are given by:
[ ]558.18.1)(12,)(5,)(4,)(1, LLKK =ratedrratedrratedrratedr vvvv (21)
SettingRFSL = 150m / 2 = 106m, the optimized switch resistances are given by:
[ ] [ ]= mmmmrrrr ssss 240240141412541 LLKK (22)
This corresponds to the following transistor widths:
[ ] [ ]mmmmmmmmSSSS 4.94.94.254.2512541 LLKK = (23)
The above analysis ignores parasitic resistances, which are actually the dominating
resistances in this design. With each bondwire having a resistance of about 250m, the
contribution of bondwire resistances to RFSL is 160m, even though there are multiple
bondwires per transistor terminal as described in section 5. Bondwire resistance alone has
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exceeded the requiredRFSL, making it impossible to satisfy the required RFSL even if the
power-switches have zero resistance. The final design uses transistors far wider than the
value given in equation (22). The limitations of bondwire resistances can be overcome by
using solder bump interconnect in future works.
Table I summarizes the optimization results and the design values outlined in this section.
Column 1 of Table I shows the ideal transistor value as given by equations (22) and (23),
whereas column 2 of Table I shows the actual transistor values used in this design.
Column 2 of Table I also shows the estimated effects onRFSL of bondwire resistances, on-
chip metal resistances, test socket resistance, capacitorRESR, and switch resistances. The
second last row of Table I shows the estimated ROUT in both the ideal calculation and the
actual design. The last row of Table I also shows the estimated frequency-dependent
switch loss due to the power consumed by driving the power switches.
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4. Circuit Design
4.1 Driver block circuit
Figure 12 shows the details of the driver blocks shown in Figure 9. The main functions of
these driver blocks are to serve as gate drivers, and to shift the clock signal upward across
adjacent voltage domains. The buffer and level-shifter [5] fulfill these two respective
functions. The Schmitt Trigger and delay line is used to speed up the clock edge and
approximately line up the clock edges for multiple power switches. Regeneration of the
clock edge is necessary because the level-shifter is a slow circuit and has a slow output
signal edge. A slow clock edge could cause significant power loss due to short circuit
current in the large buffer. The delay line offsets the skew of the clock signal due to the
delay of the level-shifters, so that the clock is re-aligned at its respective power switch
gate. Clock skew at the gates of the power switches would increase the required dead-
time between the two non-overlapping phase clocks, which would in turn reduce the duty
cycle and also limit the maximum clock frequency. A 50% duty cycle is desirable for
switched-capacitor circuit operation to allow maximum time for all voltages to settle in
each phase.
4.2 Clock Generation Circuit
Figure 13 shows the detail of the clock generator block. This clock generator takes in an
off chip clock signal and generates a non-overlapping clock with dead-time controlled by
an off-chip tunable resistor. By tuning the off-chip resistor from 1k to 1M, a dead-
time from 1ns to 1s can be attained. A tunable dead-time is necessary because the delay
of the level-shifter circuit shown in figure 12 is strongly dependent on voltage variations,
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process variations and temperature, and it is very challenging to set a dead-time at design
time that will guarantee a non-overlapping gate drive in all conditions. A non-
overlapping gate drive is very important not only because short circuit current through
the power transistor reduces efficiency, but because this can significantly distort the
steady state power-train capacitor voltages and lead to malfunctioning of level-shifters.
4.3 Helper Rail Implementation
As mentioned in section 3.1, bypass capacitors C8 to C10 are included to provide gate
drive to power switches. Capacitors C8 and C9 are implemented similar to the power-train
capacitors, C1 C7, as shown in figure 9. Implementation ofC10 is shown in figure 14.
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During phase 1 of the clock, C10 is charged to 1.5V by the output terminal; while during
phase 2 of the clock, C10 provides gate drive charge to transistor S4. This process is
achieved by having 3 additional transistors and using the control signal from the driver
block as shown.
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5. Layout
Figure 15 shows the die photo of the circuit. As evident from the photo, all power
switches are located at the periphery of the die to minimize the on-chip metal resistances.
The buffers driving these power switches are placed next to the power switches, but are
not easily distinguishable in the case of the 1.5V switches. All the other circuits are
placed in the small block in the middle of the die. Bond pads are designed to allow
double bonding of 1mil gold wire on each pad to reduce bond-wire resistances and
inductances.
Due to the large current multipler coefficient ar,i of the 1.5V switches, series parasitic
resistances at the 1.5V switches terminals have a substantial impact on the overall RFSL.
In order to further reduce the series parasitic resistance of the 1.5V switches, 5 bond pads
are placed in parallel for each 1.5V switch terminal. This results in the slender aspect
ratio of the 1.5V switches as shown in Figure 15. All of these factors make the active
circuitry concentrate at the periphery of the die and leave the middle portion empty.
Decoupling capacitors are added in this empty space to reduce the effect of parasitic
inductances of the bond-wires, which can cause serious ringing as shown in figure 16 in
section 6. There are about 200pF of decoupling capacitors across each of the 3V power
domains, and about 1nF of decoupling capacitors across each of the 1.5V power domains.
However, even including the decoupling capacitors, 55% of the die is still empty. Table
II shows the layout area of the various components of the circuit.
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6. Experimental Results
Figure 16 shows the waveform of the output voltage rail at 1A load current at the nominal
switching frequency of 1MHz. This waveform shows a 100mV peak to peak ripple
voltage due to the relatively low output capacitance of 24F. The bottom two waveforms
shown in figure 16 are gate drive waveforms at the bottom two (ground referenced)
power switches, illustrating the non-overlapping clock signals. The ringing on these two
gate drive signals is due to parasitic inductances of bondwires.
Figure 17 shows measured and theoretical output resistance ROUT of the converter at a
range of switching frequencies. The solid curve shows the theoretical value expected by
using the calculations and values reported in sections 3.4, whereas the dots are the
experimental results obtained at a range of load current levels for each frequency. One
can see that the circuit behaves very similarly to the theoretical calculation results.
Figure 18 shows the efficiency of this converter versus load current at 1MHz switching
frequency. Again, the solid curve shows the theoretical value whereas the dots show the
experimental results. The theoretical efficiency curve includes two loss components:
load-independent switching loss (about 1 mW) and a load-dependent loss reflecting the
finite output resistance. The experimental data matches very well with the theoretical
curve. It shows a peak efficiency of 98% at 50mA load and a maximum possible load of
about 1.5A. Significantly, the efficiency remains at 90% or higher for the load range from
6 mA to 400 mA without need for any mode or switching frequency adjustments. The
efficiency at low load condition can be further increased by reducing the switching
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frequency of the circuit since most fixed loss arises from the switching action of the
converter.
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7. Discussion
This thesis has proved the feasibility of realizing a moderate-voltage switched-capacitor
dc-dc converter in a 0.18m technology. However, the data suggests that the circuit has
yet to fully reveal the full potential of this circuit strategy. As evident from Table I, the
dominating factors ofRFSL is bondwire resistance followed by socket resistance, instead
of the MOSFET triode region resistance. These dominant loss contributors can be
reduced by using solder bump pads to eliminate bondwires and other interconnect
pathways to the printed circuit board. Future use of this option not only allows the
designer to potentially reduce RFSL by 66%, but also to get rid of all the bondpads and
place some of the power transistors in the center of the die. This would reduce the die
area from 9mm2
to 3mm2, or would allow for a design with larger transistors supporting a
much higher output current. Further, solder bump interconnect offers the promise of
reduced parasitic inductance, enabling more effective off-chip bypassing. The latter
consideration could potentially allow for further die area reduction by elimination of on-
chip bypass capacitance.
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8. Conclusion
This thesis presents the design and measured performance of a 12V-to-1.5V switched
capacitor dc-dc converter realized in a 0.18m technology. This circuit shows a peak
efficiency of 98% at 50mA load and a maximum load of about 1.5A. Significantly, the
efficiency remains at 90% or higher for the load range from 6 mA to 400 mA without
need for any mode or switching frequency adjustments. The active die area is 3mm2 in a
0.18m technology.
This thesis shows that highly efficient moderate voltage level conversion is realizable in
low voltage technology by using triple-well isolation to separate the circuits into various
voltage domains, each of which supports voltages that are only a fraction of the total
voltage incident on the die. The circuit strategy allows potential integration of the dc-dc
conversion function with the main function circuit core, and further allows use of silicon
area more efficiently when compared to the traditional buck converter.
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Acknowledgment
I would like to thank National Semiconductor Inc for donating the process and financially
supporting this project. I would also like to thank Professor Seth R Sanders, Michael D
Seeman and Jian-Hui Zhang for advices and supports in this project.
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References
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Capacitor dc-dc converter,IEEE COMPEL workshop, pp 216-224, July 2006
[2] Michael D. Seeman, Analytical and Practical Analysis of Switched-Capacitor DC-
DC Converters, master thesis, University of California, Berkeley, May 19, 2006
[3] Werner Muth, Matrix Method for Latch-up Free Demonstration in a Triple-Well
Bulk-Silicon Technology,IEEE transaction on Nuclear Science, vol 9, issue 3, part
1-2, pp 296-400, June 1992
[4] J.F. Dickson, On-chip high-voltage generation in NMOS integrated circuits using an
improved voltage multiplier technique,IEEE J. Solid-State Circuits, vol 11, pp 376-
378, June 1976
[5] S Rajapandian, K shepard, P Hazucha, et al., High-tesion power delivery: operating
0.18um CMOS digital logic at 5.4V, Solid State circuit conference, vol 1, pp 298-
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[6] M.S. Makowski and D. Maksimovic.Performance Limits of Switched-Capacitor DC-
DC Converters. Power Electronics Specialists Conference, June 18-22 1995, pp
1215-1221
[7] L. Chua, C. Desoer, and E. Kuh. Linear and Nonlinear Circuits. McGraw Hill, New
York, 1987